Colouring set families without monochromatic k-chains

Abstract

A coloured version of classic extremal problems dates back to Erdos and Rothschild, who in 1974 asked which n-vertex graph has the maximum number of 2-edge-colourings without monochromatic triangles. They conjectured that the answer is simply given by the largest triangle-free graph. Since then, this new class of coloured extremal problems has been extensively studied by various researchers. In this paper we pursue the Erdos--Rothschild versions of Sperner's Theorem, the classic result in extremal set theory on the size of the largest antichain in the Boolean lattice, and Erdos' extension to k-chain-free families. Given a family F of subsets of [n], we define an (r,k)-colouring of F to be an r-colouring of the sets without any monochromatic k-chains F1 ⊂ F2 ⊂ … ⊂ Fk. We prove that for n sufficiently large in terms of k, the largest k-chain-free families also maximise the number of (2,k)-colourings. We also show that the middle level, [n] n/2 , maximises the number of (3,2)-colourings, and give asymptotic results on the maximum possible number of (r,k)-colourings whenever r(k-1) is divisible by three.